3.2.11. (a) Show that if 0 < 0 < equality holds if and only if t = 1 Hint: Consider the derivatives %3D (b) Suppose that 1< p< ∞ a: and 0 = 1/p to show that ab (c) Prove that equality holds in

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Material :Daly analysis
3.2.11. (a) Show that if 0 < 0 < 1, then t° < Ot + (1 – 0) for all t>0, and
equality holds if and only if t = 1.
Hint: Consider the derivatives of tº and Ot + (1– 0).
(b) Suppose that 1 <p< o and a, b > 0. Apply part (a) with t = a®b-P
and 0 = 1/p to show that
|
aP
ab <
(c) Prove that equality holds in part (b) if and only if b = a"-1.
Transcribed Image Text:3.2.11. (a) Show that if 0 < 0 < 1, then t° < Ot + (1 – 0) for all t>0, and equality holds if and only if t = 1. Hint: Consider the derivatives of tº and Ot + (1– 0). (b) Suppose that 1 <p< o and a, b > 0. Apply part (a) with t = a®b-P and 0 = 1/p to show that | aP ab < (c) Prove that equality holds in part (b) if and only if b = a"-1.
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